HF2-synthetic homotopy groups of topological modular forms

Abstract

To any Adams-type spectrum E, Pstragowski produced a symmetric monoidal stable ∞-category SynE whose objects are, in a sense, ''formal Adams spectral sequences''. SynE comes equipped with a lax symmetric monoidal functor E:Sp SynE from classical spectra, which embeds Sp fully and faithfully in SynE, and is a category with a natural notion of bigraded homotopy groups. The bigraded homotopy groups π*,*EX systematically record information about the homotopy groups π*X and the E-Adams spectral sequence of X. In this paper, we compute the HF2F2-Adams spectral sequence of HF2tmf2, synthetic versions of hidden 2-, η-, -, and -extensions, and use this to deduce information about the homotopy ring structure of π*,*HF2tmf2.